Acyclic space: Difference between revisions
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* [[Space with homology of finite type]] | * [[Space with homology of finite type]] | ||
* [[Space with free homology]] | * [[Space with free homology]] | ||
* [[Space with perfect fundamental group]] | |||
==Metaproperties== | ==Metaproperties== | ||
Revision as of 18:15, 2 December 2007
This article defines a property of topological spaces that depends only on the homology of the topological space, viz it is completely determined by the homology groups. In particular, it is a homotopy-invariant property of topological spaces
View all homology-dependent properties of topological spaces OR view all homotopy-invariant properties of topological spaces OR view all properties of topological spaces
This is a variation of contractibility. View other variations of contractibility
Definition
A topological space is said to be acyclic if the homology groups in all dimensions are the same as those of a point, for any homology theory. Equivalently, it suffices to say that the singular homology groups are the same as those for a point.
Relation with other properties
Stronger properties
- Contractible space
- Weakly contractible space: In fact a weakly contractible space is precisely the same thing as a simply connected acyclic space
Weaker properties
- Space with finitely generated homology
- Space with homology of finite type
- Space with free homology
- Space with perfect fundamental group
Metaproperties
A product of acyclic spaces is acyclic. The proof of this relies on the Kunneth formula.